1. Sketch the region in the complex plane that contains the elements of {Z – 3+i:ze...
2. Shade the region of the complex plane defined by <z +4 + 3i : 3 < 3 < 5,2 EC}. Include the appropriate axis labels and any significant points.
(a) (2 points) In the plane below, sketch the region corresp below, sketch the region corresponding to: {(x, y) - 1<y <2}. Use the convention that, if the boundary of a region is included in the dicated using a solid line. Otherwise, use a dashed/dotted line. Clearly show any 2 and y intercepts on your graph.
3. Fin a) P(z < 2.37) b) P(z > -1.18) c) P(-1.18 < z < 2.37)
Sketch the following region in the complex plane: the set of z such that z (32i) 2
The solid S sits below the plane z = 2x + 5 and above the region in the xy-plane where 1 < x2 + y2 = 4 and x + y < 0. The volume of S is:
Sketch the region corresponding to the statement PC - c<z<c) = 0.6. Shade: Left of a value Click and drag the arrows to adjust the values. . +++++++++ 4 -3 0 -2 1-7 -1.5 2
Given the logistic map Xn+1 = run(1 – Xn) with r > 0. Show the 2-cycle is stable for 3 <r <1+V6.
2) Find the inverse z Transform of the following signal: 223-5z2+z+3 X(z) = (z-1)(z-3) [z] <1
12. Consider the region bounded above by the function ?=1/(?+2)2(?+6)^2 and below by the xy-plane for x≥0 and ?≥0. (1 point) Consider the region bounded above by the function z = - "2" (x + 2)2(y + 62 an and below by the xy-plane for x > 0 and y 2 0. On a piece of paper, sketch the shadow of the region in the xy-plane. Set up double integrals to compute the volume of the solid region in two...
(1 point) Find the volume of the region enclosed by z = 1 – y2 and z = y2 – 1 for 0 < x < 39. V =